Difference between revisions of "PartialFractions Command"
From GeoGebra Manual
m (Text replace - ";(.*)\[(.*)\]" to ";$1($2)") |
(command syntax: changed [ ] into ( )) |
||
Line 2: | Line 2: | ||
;PartialFractions( <Function> ) | ;PartialFractions( <Function> ) | ||
:Yields, if possible, the [[w:Partial fraction|partial fraction]] of the given function for the main function variable. The graph of the function is plotted in the [[File:Menu view graphics.svg|link=|16px]] [[Graphics View]]. | :Yields, if possible, the [[w:Partial fraction|partial fraction]] of the given function for the main function variable. The graph of the function is plotted in the [[File:Menu view graphics.svg|link=|16px]] [[Graphics View]]. | ||
− | :{{example|1= | + | :{{example|1=<code><nowiki>PartialFractions(x^2 / (x^2 - 2x + 1))</nowiki></code> yields ''1 + <math>\frac{1}{(x - 1)²}</math> + <math>\frac{2}{x-1}</math>''.}} |
{{hint|1= | {{hint|1= | ||
Line 9: | Line 9: | ||
;PartialFractions( <Function>, <Variable> ) | ;PartialFractions( <Function>, <Variable> ) | ||
:Yields, if possible, the partial fraction of the given function for the given function variable. | :Yields, if possible, the partial fraction of the given function for the given function variable. | ||
− | :{{example|1= | + | :{{example|1=<code><nowiki>PartialFractions(a^2 / (a^2 - 2a + 1), a)</nowiki></code> yields ''1 + <math>\frac{1}{(a - 1)²}</math> + <math>\frac{2}{(a-1)}</math>''.}} |
}} | }} |
Latest revision as of 09:42, 9 October 2017
- PartialFractions( <Function> )
- Yields, if possible, the partial fraction of the given function for the main function variable. The graph of the function is plotted in the Graphics View.
- Example:
PartialFractions(x^2 / (x^2 - 2x + 1))
yields 1 + \frac{1}{(x - 1)²} + \frac{2}{x-1}.
Hint: In the CAS View you can also use the following syntax:
- PartialFractions( <Function>, <Variable> )
- Yields, if possible, the partial fraction of the given function for the given function variable.
- Example:
PartialFractions(a^2 / (a^2 - 2a + 1), a)
yields 1 + \frac{1}{(a - 1)²} + \frac{2}{(a-1)}.